Tracer Diffusion of Flexible Probe Macromolecules ... - ACS Publications

Chein-Shiu Kuo, Rama Bansil, and Cestmir Konak. Macromolecules , 1995, 28 (3), pp 768–770. DOI: 10.1021/ma00107a012. Publication Date: January 1995...
1 downloads 0 Views 380KB Size
Macromolecules 1995, 28, 768-770

768

Notes Tracer Diffusion of Flexible Probe Macromolecules at the Sol-Gel Transition

The goal of this study is to understand the role of the permanent cross-links on the probe polymer dynamics, particularly at the sol-gel transition.

Chein-Shiu Kuo and F&ma B a n d *

Experimental Section

Center for Polymer Studies and Department of Physics, Boston University, Boston, Massachusetts 02215

Cestmir Koiiislk Institute of Macromolecular Chemistry, Academy of Sciences of the Czech Republic, 162 06 Prague 6,Czech Republic Received August 4, 1994 Revised Manuscript Received October 19, 1994

Introduction The diffusion of macromolecules in swollen gels is a n important component of many different industrial and biological problems such as transport across membranes, gel electrophoresis, flow through porous media, and intracellular protein diffusion. Quasielastic light scattering has been applied to study probe diffusion in swollen gels as a function of the probe polymer's In our previous molecular weight and s t ~ d i e s ~of+the ~ s diffusion ~ of linear polystyrene (PS)538 and poly(methy1 methacrylate) (PMMAI6v8 probes in swollen methyl methacrylate (MMA) gels cross-linked with ethylene dimethacrylate (EDMA), we have found that the diffusion constant Dt obeys the reptation prediction Dt Mp-1,8provided the molecular weight Mp is higher than some critical molecular weight M,. The critical molecular weight depends on the mesh size of the gel, and for Mp M,the probe polymer diffises as a Stokes-Einstein particle of hydrodynamic radius Rh Mpo,6.In the corresponding semidilute solutions of linear PMMA prepared by polymerizing MMA under conditions identical to those used for making the gels, we observed Stokes-Einstein scaling even when Mp > Me, the molecular weight between entanglements. In a n earlier study of probe diffusion in semidilute solutions of PMMA Numasawa et al.9 found that the crossover from Stokes-Einstein to reptation scaling occurred when M p = Me.Thus, by comparing the results for the gel with the semidilute solution of the same concentration, we suggest that the crossover from Stokes-Einstein to reptation occurs at lower molecular weights in gels as compared to semidilute solutions due to the presence of permanent cross-links in gels. In this paper the effect of varying the cross-link content on the probe dynamics is studied in semidilute solutions of branched PMMA polymers below the gel point and in gels in the vicinity of the gel point using dynamic light scattering (DLS). To simplify the analysis of DLS data, toluene was chosen as a solvent for this study because it is isorefractive with the PMMA matrices. Although PS and PMMA are incompatible polymers, both are highly soluble in toluene and phase separation does not occur at the low concentrations of PS used in these samples. This point has been discussed extensively in our previous paper^.^,^

-

-

0024-9297/95/2228-0768$09.00/0

The samples used in these experiments are PMMA solutions and gels obtained by copolymerizing methyl methacrylate monomer (MMA)with small amounts of ethylene dimethacrylate as the cross-linkingagent in the presence of toluene. The probe polymer, linear polystyrene (Polysciences, MJM,, < 1.06), was added to the pregel monomer mixture. The concentration of PS in different samples, cpg, was increased with decreasing molecular weight to compensate for the decrease in the intensity of scattered light with decreasing molecular weight. For all the samples cpg 1.13 x lo5 is close to the reptation prediction in MMA gels with fdfcg L 1.5.15 Reptation has been observed for probe polymers with hydrodynamic diameters (mh) larger than the mesh sizes, gm, of the cross-linked gels and S-E diffusion for mh < gm. The effective gm seems to be related to the spacing between permanent cross-links rather than to that between transient entanglements. It is interesting t o note that for the high molecular weight probes in the reptation regime, fdfcg L 1.5, the slope of log Dt versus fdfcg is again similar to the values obtained for the low molecular weight probes, implying that the effective microscopic viscosity follows the same exponential dependence on cross-link content, irrespective of the diffusional mechanism of the probe. The most interesting regime of fc in the MMA system under study is in the vicinity of the gel point where it is plausible to suppose trn mh. For this regime the scaling theories of de Gennes et al.16J7 describing the passage of flexible chains through pores can be adopted. Assuming that the permanent cross-links are forming channels (pores, tubes) with the pore size of Em, then the ratio of the probe diffusivity in the pore D , (=Dt) to that in the solution, DO,is given by16-18

-

-

-

-

which is equivalent to D = Dt MP-l for a good solvent (Dp Mp-6/1fMP-4/10 = M P - l ) . Figure 3 also serves as a comparison of the experimental results t o this scaling theory. The molecular weight dependence MP-l can be observed for Dt data at the gel point cfdfcg = 1). Thus, o u r results support the application of the "pore" model to the transport of flexible chains through a gel in the vicinity of the gel point.

In the region from fdfcg= 1to 1.5 the exponent of the M p dependence of Dt varies continuously from the value of -1 to -2. This experimental result cannot be explained, t o the best of our knowledge, by existing theories. In conclusion, we point out that the role of temporal cross-links (entanglements) has been overestimated in the reptation theory of semidilute solutions. The fact that even high molecular weight probes do not reptate in these particular linear polymer matrices whereas they reptate in the corresponding gels implies that the presence of permanent cross-links stabilizes the transient entanglements. Only in semidilute solutions of high molecular weight polymers, where the dynamics of the matrix chains is slowed down by several entanglem e n t ~(>4), ~ the transient network is stable enough to control the transport of probe polymer chains and causes the probe to reptate. A possible explanation for this difference in probe diffusion between semidilute solution and gel is suggested by a model describing the fluctuations in the dynamics of concentrated polymer solut i o n ~ The . ~ ~essential idea is that when a chain replates in some medium, there is an increase in the local chain concentration in the newly created part of the tube and a concommitant decrease in the local concentration around the part of the tube from which the chain moved out. This creates a potential barrier for diffusion. In the un-cross-linked solution this barrier has a finite lifetime, while increasing the cross-link content increases the lifetime of this barrier, and the retardation of the diffision due to this barrier is more and more pronounced. We also find that in both the StokesEinstein and the reptation regimes increasing the crosslink content leads to an increased microscopic viscosity, which depends exponentially on the cross-link content.

Acknowledgment. This research was supported by grants from NSF-DMR Polymers Program and NSF US.-Czechoslovakia Cooperative Research Programs. R.B. also acknowledges a Science Scholars Fellowship from the Bunting Institute of Radcliffe College, Cambridge, MA. References and Notes Higgerty, L.; Sugarman, J. H.; Prudhomme, R. K.Polymer 1988,29,1058. Widmaier, J.M.; El-Ouriaghli, T.; Leger, L.; Marmonier, M. F. Polymer 1989,30,549. Yoon, H.; Kim, H.; Yu, H. Macromolecules 1989,22,848. Aven, M. R.;Cohen, C. Polymer 1990,31,778. Bansil, R.;Pajevic, S.; KoiiAk, Macromolecules 1990,23, 3380. Pajevic, S.;Bansil, R.; Koiigk, J . Non-Cryst. Solids 1991, 131-133,630. Rotstein, N. A.;Lodge, T. P. Macromolecules 1992,25,1316. Pajevic, S . ; Bansil, R.; Koiigk, Macromolecules 1993,26, 305. Numasawa, N.; Kuwamoto, K.; Nose, T. Macromolecules 1988,19,2593. Provencher, S . Comput. Phys. Commun. 1982,27,213. Benmouna, M.; Benoit, H.; Duval, M.; Akcasu, Z. Macromolecules 1987,20, 1107. Kofdk, Tuzar, Z.; Jakes, J. Polymer 1990,31,1966. Candau, S.;Bastide, J.;Delsanti, M.Adv. Polym. Sci. 1982, 44, 27. Reina, J. C.; Bansil, R.; Kofigk, C. Polymer 1990,31,1038. de Gennes, P.-G. Macromolecules 1988,19,1245. Brochard, F.;de Gennes, P.-G. J. Chem.Phys. 1977,67,52. Daoud, M.; de Gennes, P.-G. J . Phys. (Paris) 1977,38,85. de Gennes, P.-G. Scaling Concepts in Polymer Physics; Cornel1 University Press: Ithaca, NY,1979. Semenov, A.N.Sou. Phys. JETP 1989,69,118.

e.

c.

e.

e.;

MA941091L